Charge balanced charge pump control

ABSTRACT

Operating a charge pump in which switches from a first set of switches couple capacitor terminals to permit charge transfer between them and in which switches from a second set of switches couple capacitor terminals of capacitors to either a high-voltage or a low-voltage terminal includes cycling the switches through a sequence of states, each state defining a corresponding configuration of the switches. At least three of the states define different configurations of the switches. During each of the configurations, charge transfer is permitted between a pair of elements, one of which is a first capacitor and another of which is either a second capacitor or the first terminal.

RELATED APPLICATIONS

Under 35 USC 120 this application is a continuation of U.S. application Ser. No. 16/185,273, filed on Nov. 9, 2018, now U.S. Pat. No. 10,348,195, which is a continuation of U.S. application Ser. No. 15/126,050, filed on Sep. 14, 2016, now U.S. Pat. No. 10,128,745, issued on Nov. 13, 2018, which is the national phase under 35 USC 371 of International Application No. PCT/US2015/019579, filed on Mar. 10, 2015, which claims the benefit of the Mar. 14, 2014 priority date of U.S. Provisional Application 61/953,270, the contents of which are herein incorporated by reference.

FIELD OF INVENTION

This invention relates to control for charge pumps to balance charge.

BACKGROUND

Patent Publication WO 2012/151466, published on Nov. 8, 2012, and incorporated herein by reference, describes configurations of charge pumps, also known as switched capacitor converters, in which the source and/or load comprise regulating/regulator circuits. In some examples, the load can effectively comprise a current source and/or load rather than present a constant voltage in an example of what is referred to as “adiabatic” operation of a charge pump. Regulating/regulator circuits, such as switch-mode power converters, behave as current loads/sources. Therefore, current loads/sources and regulating/regulator circuits are interchangeable for the purpose of this disclosure.

Although use of a current-based load (and/or source) may improve efficiency as compared to a purely or substantially voltage-based load (and/or source), internal energy losses may remain, for example, due to redistribution of charges within the charge pump.

SUMMARY

One effect of using a current-based load (and/or source) with a charge pump is that there may be situations in which a conventional switch timing used with voltage-based loads and/or sources results in charge imbalance across capacitors, which can result in loss of efficiency, for example, due to charge redistribution immediately after switching between configurations in the charge pump.

In one aspect, in general, an approach to improving efficiency of a charge pump using adiabatic charge transfer makes use of three or more states, each corresponding to a configuration of switches coupling capacitors to one another and/or the input and output terminals of the charge pump. By introducing an appropriate sequence of more than two states in which charge is transferred to or from capacitors, and selecting the duration those states are occupied in each operating cycle of the charge pump, charge transfer in and out of each capacitor is balanced over the operating cycle, thereby avoiding or greatly reducing charge redistribution at state transitions and its associated power losses that lead to inefficiency.

In one aspect, the invention features an apparatus for coupling to capacitors to form a charge pump circuit. Such an apparatus includes a first and second set of switch elements and a controller circuit. The first set of switch elements comprises switch elements that are configured to couple terminals of capacitor elements to permit charge transfer between the capacitors. The second set of switch elements comprises switch elements that are configured to couple terminals of at least some of the capacitor elements to a first terminal, which is either a high voltage terminal or a low voltage terminal. The controller circuit is coupled to the switch elements and configured to cycle the switch elements through a sequence of states. Each state defines a corresponding configuration of the switch elements. At least three of the states define different configurations of the switch elements permitting charge transfer between a pair of elements. The pair of elements is either a pair of capacitors, or a capacitor and a terminal. The configured cycle of states provides a voltage conversion between the high voltage terminal and the low voltage terminal.

In some embodiments, there are terminals for coupling the switch elements to the capacitors.

Other embodiments include the capacitors themselves. In these embodiments, the capacitors, when coupled to the switch elements, define a charge pump circuit.

Some embodiments comprise an integrated circuit. In these embodiments, at least part of the charge pump circuit and at least part of the controller circuit are formed in a single integrated circuit.

Also among the embodiments are those that include a regulator circuit. In these embodiments, the regulator circuit is coupled to at least one of the high voltage terminal and the low voltage terminal of the charge pump circuit. In some of these embodiments, the regulator circuit is configured to provide a current load at the low voltage terminal of the charge pump circuit. In others, the regulator circuit is configured to operate as a current source at the low voltage terminal of the charge pump circuit. In yet others, the regulator circuit is configured to provide a current load at the high voltage terminal of the charge pump circuit, or to operate as a current source at the high voltage terminal of the charge pump circuit, or to cause a pulsed current to pass between the regulator circuit and the charge pump circuit. In the latter case, the charge pump operates in a pulse cycle having a first fraction, during which the pulsed current is a first constant current, and a second fraction, during which the pulsed current is greater in magnitude than the second constant current. In many cases, the second constant current is substantially zero or even equal to zero. Typically, the first constant current is substantially larger than the second constant current.

In some embodiments, a regulator circuit is configured to control an average current passing between the regulator circuit and the charge pump circuit.

In those embodiments that feature a regulator, a great many regulator types can be used. These include regulators that are switch-mode power converters, or buck converters, or even magnetic filters.

In some embodiments, the controller is configured to maintain each state for a corresponding duration of a fraction of a charge pump cycle time. The durations of these states are selected to maintain a balanced charging and discharging of each of the capacitors through the sequence of states of each cycle.

In other embodiments, the controller is configured to select durations of the states to reduce redistribution of charge among the capacitors upon state transitions.

When coupled to the terminals of the capacitor elements, the switch elements define any of a variety of charge pump circuits. Examples include a multi-phase charge pump, a single-phase charge pump, a multi-stage charge pump, and a cascade multiplier.

Also among the embodiments are those in which the controller is configured to receive sensor signals from at least one of the first and second sets of switch elements and to adaptively adjust cycling of the switch elements through the sequence of states based at least in part on the sensor signals.

In some embodiments, there are two regulator circuits. A regulator circuit is coupled to the high voltage terminal of the charge pump circuit. Meanwhile, a second regulator circuit is coupled to the low voltage terminal of the charge pump circuit. Either the first or second regulator can be a magnetic filter. Among these embodiments are those in which the controller is configured to receive sensor signals from at least one of the first and second sets of switch elements and to adaptively adjust cycling of the switch elements through the sequence of states based at least in part on the sensor signals.

In another aspect, the invention features a method for operating a charge pump in which switch elements from a first set of switch elements are configured to couple terminals of capacitor elements to permit charge transfer between the capacitors, and in which switch elements from a second set of switch elements are configured to couple terminals of capacitor elements to either a high voltage terminal or a low voltage terminal. Such a method includes causing a voltage conversion between the high voltage terminal and the low voltage terminal. Causing this voltage conversion includes cycling the switch elements through a sequence of states. Each state defines a corresponding configuration of the switch elements. At least three of the states define different configurations of the switch elements permitting charge transfer between a pair of elements. The pair of elements is either a pair of capacitors or a capacitor and a one of the terminals.

Some practices of the invention include maintaining an average current passing between a regulator circuit and the charge pump circuit. Others include regulating a current at the first terminal, thereby maintaining an average current passing between a regulator circuit and the charge pump circuit.

In other practices, cycling the switch elements through a sequence of states includes maintaining each state for a corresponding duration of a fraction of a charge pump cycle time. This can also include selecting the durations of the states are selected to maintain a balanced charging and discharging of each of the capacitors through the sequence of states of each cycle.

Some practices of the invention include controlling an average current between a regulator circuit and the charge pump circuit.

Other practices include coupling a regulator circuit to the first terminal. Among these are practices that include causing the regulator circuit to provide a current load at the low voltage terminal of the charge pump circuit, causing the regulator circuit to provide a current load at the high voltage terminal of the charge pump circuit, causing the regulator circuit to operate as a current source at the low voltage terminal of the charge pump circuit, causing the regulator circuit to operate as a current source at the high voltage terminal of the charge pump circuit, and causing a pulsed current to pass between a regulator circuit and the charge pump circuit.

Some practices include coupling the switch elements from the first and second sets of switch elements to the terminals of the capacitor elements. This can result in forming a multi-phase charge pump, a single-phase charge pump, a multi-stage charge pump, or a cascade multiplier.

Those practices that involve a regulator include selecting the type of regulator. This can include selecting the regulator to be a switch-mode power converter, selecting the regulator to be a buck converter, or selecting the regulator to be a magnetic filter.

Some practices also include receiving sensor signals from at least one of the first and second sets of switch elements and adaptively adjusting the cycling of the switch elements through the sequence of states based at least in part on the sensor signals.

Some practices involve the use of two regulators. These practices further include coupling a first regulator to the high voltage terminal and coupling a second regulator to the low voltage terminal. One of the regulators can be a magnetic filter while the other is a converter. Among these practices are those that also include controlling least one of the first and second sets of switch elements and adaptively adjusting the cycling of the switch elements through the sequence of states based at least in part on sensor signals received from at least one of said first and second sets of switch elements.

Other features and advantages of the invention are apparent from the following description, and from the claims.

DESCRIPTION OF THE DRAWINGS

FIG. 1 is a schematic diagram of a single-phase 5:1 charge pump with a voltage source and a current load.

FIGS. 2A and 2B are schematic diagrams of the circuit of FIG. 1 in states 1 and 2, respectively, of the switch configuration.

FIGS. 3A, 3B, and 3C are schematic diagrams of the circuit of FIG. 1 in states 1 a, 1 b, and 2, respectively.

FIG. 3D is a set of waveforms showing the voltage across each capacitor in FIGS. 3A-3C during the operation of the charge pump.

FIGS. 4A, 4B, and 4C are schematic diagrams of the circuit of FIG. 1 in alternative definitions of states 1 a, 1 b, and 2, respectively.

FIG. 4D is a set of waveforms showing the voltage across each capacitor in FIGS. 4A-4C during the operation of the charge pump.

FIG. 5 is a schematic diagram of a single-phase 6:1 charge pump with a voltage source and a current load.

FIGS. 6A, 6B, 6C, and 6D are schematic diagrams of the circuit of FIG. 5 in states 1 a, 1 b, 2 a, and 2 b, respectively.

FIG. 7 is a schematic diagram of a two-phase 5:1 charge pump with a voltage source and a current load.

FIGS. 8A and 8B are schematic diagrams of the circuit of FIG. 7 in states 1 a and 1 b, respectively.

FIG. 9 is a schematic of a two-phase 3:1 series-parallel charge pump with a voltage source and a current load.

FIGS. 10A, 10B, 10C, and 10D are schematic diagrams of the circuit of FIG. 9 in states 1 a, 1 b, 2 a, and 2 b, respectively.

FIGS. 11A and 11B are schematic diagrams of the circuit of FIG. 7 in states 1 a and 1 b, respectively with current skew.

FIGS. 12, 13, and 14 are block diagrams of power converters.

DETAILED DESCRIPTION

A first example charge pump 110 is shown in FIG. 1 to illustrate a source of charge imbalance in the operation of such a charge pump. The charge pump 110 is a cascade multiplier configured to nominally provide a 5:1 (i.e., M=5) step-down in voltage such that an output voltage V_(OUT) (volts) is one-fifth of an input voltage V_(IN) (volts). Four capacitors (labeled C₁ to C₄) are used with switches (labeled S₁ to S₉) on both terminals of each capacitor to store a fraction of the input voltage V_(IN) and transfer charge from one capacitor to the next. The capacitors closest to the V_(IN) and V_(OUT) terminals are labeled C₁ and C₄, respectively, and are referred to below as the “outer” capacitors, while the remaining capacitors labeled C₂ and C₃ are referred to below as the “inner” capacitors. As further notation, the voltage and charge on a capacitor C_(k) are denoted V_(k) and Q_(k), respectively. Unless otherwise indicated, the capacitors are treated as ideally having identical capacitance C (Farads).

The charge pump 110 is operated by controlling a set of switches (S₁ through S₉) that cause charge to pass between the capacitors and between the terminals and the capacitors. The control of the switches of the charge pump 110 can be represented as a cycle through a series of states, where each state is associated with a particular configuration of the set of switches (i.e., a particular setting of open-circuit (non-conducting) and closed-circuit (conducting) configuration of each of the switches).

One mode of operation of the charge pump 110 shown in FIG. 1 uses a cycle of two states. In a first state, namely state 1, the switches labeled “1” (i.e., S₁, S₃, S₅, S₇, S₈) are closed and the switches labeled “2” (i.e., S₂, S₄, S₆, S₉) are open. In a second state, namely state 2, the switches labeled “1” are open and the switches labeled “2” are closed. These configurations of switches are shown in tabular form (“1” indicating the switch is closed and “0” indicating that the switch is open) as follows:

Switch State S₁ S₂ S₃ S₄ S₅ S₆ S₇ S₈ S₉ State 1 1 0 1 0 1 0 1 1 0 State 2 0 1 0 1 0 1 0 0 1

Note that in practice, additional states may be needed in which all or a sufficient set of switches are open such that charge is not passing to or from the capacitors without affecting the overall function of the charge pump 110. This occurs, for example, in a “break before make” approach to avoid the necessity of truly instantaneous switching. However, for the analysis of the ideal behavior below, such additional states are not generally considered because these additional states do not involve a transfer of charge and will not affect the outcome of the analysis.

A complete cycle of the charge pump 110 has a sequence of two states, state 1 followed by state 2. A first phase node P₁ couples with the negative terminal of the capacitors C₁, C₃, and a second phase node P₂ couples with the negative terminal of the capacitors C₂, C₄. The voltage at the first phase node P₁ alternates between ground and the output voltage V_(OUT), and the voltage at the second phase node P₂ is out of phase with the first phase node P₁.

In steady-state operation, the capacitors C₁ to C₄ have nominal voltages across their terminals that are multiples of the nominal output voltage:

V₁ ^((nom))=4·V_(OUT) ^((nom))=(4/5)·V_(IN)

V₂ ^((nom))=3·V_(OUT) ^((nom))=(3/5)·V_(IN)

V₃ ^((nom))=2·V_(OUT) ^((nom))=(2/5)·V_(IN)

V₄ ^((nom))=1·V_(OUT) ^((nom))=(1/5)·V_(IN)

For example, when the input voltage V_(IN) equal to 25.0 (volts), the nominal voltages across the capacitors C₁-C₄ are 20.0, 15.0, 10.0, and 5.0 (volts), respectively, and the nominal output voltage V_(OUT) is 5.0 (volts). The actual voltages across the capacitors vary around these nominal values (i.e., the voltage exhibits “ripple”) during a cycle of the successive states of operation of the charge pump 110, denoted as

V_(k)=V_(k) ^((nom))+v_(k).

In this example, the output terminal of the charge pump 110 is treated as being coupled to a current load, with current I_(OUT). In some examples, this current is assumed constant. More generally, as discussed further below, the current may be pulsed with a constant average Ī_(OUT)=D·I_(OUT) ^((peak)), where D is the duty cycle (a fraction between zero and one) of the pulsed current load. This is a good representation of the behavior of a buck converter. In general, the current-load's switching frequency is an integer multiple of that charge pump's switching frequency. For example, it may be 2×, 3×, 10×, 100× the charge pump's switching frequency. In some examples, the current may be constant during a state, but have different values during each state. Furthermore, state transition instants are preferably chosen to occur during the zero-current part of the output current duty cycle, thereby reducing switching losses with non-ideal (e.g., transistor) switches. But for the sake of discussion of this first example, only the constant current case is considered.

FIGS. 2A-2B show the equivalent circuits of the charge pump 110 in FIG. 1 for state 1 and state 2, respectively. In state 1, energy is transferred from the V_(IN) terminal to the outer capacitor C₁, between the inner capacitors C₂, C₃, and from the outer capacitor C₄ to the V_(OUT) terminal. In state 2, energy is transferred between the capacitors and to the load at the V_(OUT) terminal.

During state 1, the outer capacitors C₁, C₄ carry a current of 0.4·I_(OUT) our while the inner capacitors C₂, C₃ each carry a current of 0.2·I_(OUT). This is half the current through the outer capacitors C₁, C₄. Therefore, if state 1 has a state-duration time t₁, then the change in charge on the outer capacitors C₁, C₄, denoted ΔQ_(kj) as the change in charge on capacitor C_(k) during state j, satisfies

+ΔQ_(1,1)=−ΔQ_(4,1)=t₁·0.4·Ī_(OUT)

while the change in charge on the inner capacitors C₂, C₃ during state 1 satisfies

−ΔQ_(2,1)=+ΔQ_(3,1)=t₁·0.2·Ī_(OUT).

Note that the inner capacitors C₂, C₃ are connected in series while the outer capacitors C₁, C₄ are the only elements in their respective paths, causing the current to divide accordingly by the number of series capacitors.

During state 2, every capacitor carries a current of 0.5·I_(OUT). The inner capacitors C₂, C₃ are always in a series connection with another capacitor in either state while the outer capacitors C₁, C₄ have a similar series connection only during state 2. The current flow polarity through each capacitor changes back and forth from one state to the next state as needed to charge and discharge the capacitor and maintain a constant average voltage across the capacitor.

If the charge pump 110 were controlled at a 50% duty cycle with t₁=t₂=0.5·T_(SW), where T_(SW) is the total duration of the switching cycle, the net charge across each cycle of two states on each capacitor C_(k), ΔQ_(k)=ΔQ_(k,1)+ΔQ_(k,2) would not be zero. A consequence of this would be that the net charge and average voltage on the capacitors may drift over successive cycles and/or may cause a sizeable redistribution of charge at each state transition. Neither of these would be desirable.

An alternative three-state control of the charge pump 110 shown in FIG. 1 uses first, second, and third states, which are labeled “1 a”, “1 b”, and “2”. The configuration of the switches in these states is shown in tabular form as follows:

Switch State S₁ S₂ S₃ S₄ S₅ S₆ S₇ S₈ S₉ State 1a 1 0 0 0 1 0 1 1 0 State 1b 0 0 1 0 0 0 1 1 0 State 2 0 1 0 1 0 1 0 0 1

The equivalent circuits in each of these states are shown in FIGS. 3A-3C, respectively. Note that in state 1 a, a current of 0.5·I_(OUT) our passes through each of the capacitors C₁, C₄ (with opposite voltage polarities), in state 1 b, a current of 1.0·I_(OUT) passes through the capacitors C₂, C₃, and in state 2, a current of 0.5·I_(OUT) passes through all four capacitors. A suitable selection of state-durations times t_(1a), t_(1b), t₂ to balance the total change in charge in each cycle must satisfy the set of equations:

ΔQ₁=0=+0.5t_(1a) −0.5t₂

ΔQ₂=0=−1.0t_(1b) +0.5t₂

ΔQ₃=0=+1.0t_(1b) −0.5t₂

ΔQ₄=0=−0.5t_(1a) +0.5t₂

T_(SW)=+1.0t_(1a)+1.0t_(1b)+1.0t₂

where the set of equations are satisfied with

t_(1a)=0.4·T_(SW)

t_(1b)=0.2·T_(SW)

t₂=0.4·T_(SW)

Assuming the state-duration times above, FIG. 3D illustrates the voltages V₁-V₄ across the capacitors C₁-C₄ in FIGS. 3A-3C when the charge pump 110 has an input voltage V_(IN) equal to 25.0 volts. This yields an output voltage V_(OUT) with average voltage of approximately 5.0 volts as shown in the FIG. 3D.

Another three-state approach to controlling the charge pump 110 of FIG. 1 uses a different sequence of states with switch configurations and corresponding equivalent circuits shown in FIGS. 4A-4C, respectively. The configuration of switches in the three states is shown in tabular form as:

Switch State S₁ S₂ S₃ S₄ S₅ S₆ S₇ S₈ S₉ State 1a 1 0 1 0 1 0 1 1 0 State 1b 0 0 1 0 0 0 1 1 0 State 2 0 1 0 1 0 1 0 0 1

An analysis as presented above applied to this definition of the states yields state-duration times that satisfy the charge balance equations of

t_(1a)=0.5·T_(SW)

t_(1b)=0.1·T_(SW)

t₂=0.4·T_(SW)

Assuming the state-duration times above, FIG. 4D illustrates the voltages V₁-V₄ across the capacitors C₁-C₄ in FIGS. 4A-4C when the charge pump 110 has an input voltage V_(IN) equal to 25.0 volts. This yields an output voltage V_(OUT) with average voltage of approximately 5.0 volts as shown in FIG. 4D. Notice how the shape of the waveforms in FIG. 4D differ from those in FIG. 3D.

A consideration of the sum of the RMS (root mean squared) currents through the capacitors shows that these state definitions yield a lower value than that of the previously described three-state configuration (FIGS. 3A-3C). In a non-ideal implementation of the charge pump 110, in which resistances including resistances in series with the capacitors cause power loss, a lower RMS current is associated with smaller power loss. Therefore, these state configurations may be preferable.

Note that different sequences of states can still result in charge balance over the repeating cycle. For example, the state sequence 1 a-1 b-2-1 a-1 b-2 . . . can be replaced with the sequence 1 b-1 a-2-1 b-1 a-2 . . . using the same state-duration times as determined above.

Other state definitions and timing also follow the approach outlined above. For instance, two additional approaches for the M=5 case are shown below in tabular form:

Switch State S₁ S₂ S₃ S₄ S₅ S₆ S₇ S₈ S₉ Duration State 1a 0 0 1 0 1 0 1 1 0 0.3 · T_(SW) State 1b 1 0 1 0 0 0 1 1 0 0.3 · T_(SW) State 2 0 1 0 1 0 1 0 0 1 0.4 · T_(SW) and

Switch State S₁ S₂ S₃ S₄ S₅ S₆ S₇ S₈ S₉ Duration State 1a 1 0 0 0 0 0 1 X 0 0.2 · T_(SW) State 1b 0 0 0 0 1 0 X 1 0 0.2 · T_(SW) State 1c 0 0 1 0 0 0 1 1 0 0.2 · T_(SW) State 2 0 1 0 1 0 1 0 0 1 0.4 · T_(SW) where X indicates that the switch can either be open or closed.

The multi-state approach presented above for the M=5 circuit of FIG. 1 may be extended directly to other odd values of M. Generally, in state 1 a, capacitor C₁ is in parallel with capacitor C_(M-1), and when M≥5 in parallel with series connections of C₂ and C₃, through C_(M-3) and C_(M-2). State 1 b has the parallel connection of the series of C₂ and C₃, through C_(M-3) and C_(M-2), and state 2 has the parallel connection of the series C₁ and C₂ through C_(M-2) and C_(M-1). A closed form of the state-duration times for general odd M can then be expressed as

t_(1a)=(M+5)/(4M)·T_(SW)

t_(1b)=(M−3)/(4M)·T_(SW)

t₂=(M−1)/(2M)·T_(SW)

A similar approach can be applied to situations where M is even. Referring to FIG. 5, a 6:1 (M=6) cascade multiplier type charge pump 110 is shown that includes ten switches labeled S₁ to S₁₀ and five capacitors labeled C₁ to C₅. The configurations for the switches in each of four states: 1 a, 1 b, 2 a, and 2 b, are shown in the table below. The equivalent circuits in each of these states are shown in FIGS. 6A-6D, respectively.

Switch State S₁ S₂ S₃ S₄ S₅ S₆ S₇ S₈ S₉ S₁₀ State 1a 1 0 1 0 1 0 0 1 1 0 State 1b 0 0 1 0 1 0 0 1 1 0 State 2a 0 1 0 1 0 1 1 0 0 1 State 2b 0 1 0 1 0 0 1 0 0 1

Applying the type of analysis described above, the state-duration times to achieve a balancing of charge transfer through the cycle of states yields:

t_(1a)=1/3·T_(SW)

t_(1b)=1/6·T_(SW)

t_(2a)=1/3·T_(SW)

t_(2b)=1/6·T_(SW)

As with M being an odd case, a general solution for arbitrary M being even yields the solution:

t_(1a)=(M−2)/(2M)·T_(SW)

t_(1b)=1/M·T_(SW)

t_(2a)=(M−2)/(2M)·T_(SW)

t_(2b)=1/M·T_(SW)

The approach described above is applicable to multi-phase charge pumps as well. For example, FIG. 7 shows a two-phase M=5 cascade multiplier type charge pump 110 that includes fourteen switches labeled S_(1a) to S_(7b) and eight capacitors labeled C_(1a) to C_(4b). The configurations for the switches in one possible four-state approach (with states labeled 1 a, 1 b, 2 a, 2 b) are shown in the table below:

Switch State S_(1a) S_(1b) S_(2a) S_(2b) S_(3a) S_(3b) S_(4a) S_(4b) S_(5a) S_(5b) S_(6a) S_(6b) S_(7a) S_(7b) State 1 0 0 1 0 1 0 1 0 0 0 1 1 0 1a State 0 0 0 1 0 1 0 1 0 1 0 1 1 0 1b State 0 1 1 0 1 0 1 0 0 0 1 0 0 1 2a State 0 0 1 0 1 0 1 0 1 0 1 0 0 1 2b

FIGS. 8A-8B show the equivalent circuits for states 1 a and 1 b, respectively. The circuits for states 2 a and 2 b are equivalent (i.e., interchanging the “a” and “b” elements of the circuit). Applying the charge balance constraints for this circuit yields the state-duration times of 0.25·T_(SW) for each of the four states as shown below:

t_(1a)=1_(2a)=0.25·T_(SW)

t_(1b)=t_(2b)=0.25·T_(SW)

Note that in this example, the input current from the V_(IN) terminal is zero during states 1 b and 2 b while non-zero during states 1 a and 2 a at a current of 0.4·I_(OUT), yielding an average input current of 0.2·Ī_(OUT)=Ī_(OUT)/M as expected.

Referring to FIG. 7, a parallel arrangement of two sections as shown in FIG. 1; the timing of each section is 90° out of phase, such that one section has the switch configuration of state 1 a while the other section has the switch configuration of state 1 b, and so forth. Note that in this parallel arrangement, the average input current is 0.2·Ī_(OUT)=Ī_(OUT)/M in each cycle of operation.

The approaches described above are applicable to a wide range of charge pump topologies. As a further example, an FIG. 9 shows a M=3 two-phase series-parallel charge pump 110 that includes fourteen switches labeled S_(1a) to S_(7b) and four capacitors labeled C_(1a) to C_(2b). The configuration of switches in the four states is shown in tabular form as:

Switch State S_(1a) S_(1b) S_(2a) S_(2b) S_(3a) S_(3b) S_(4a) S_(4b) S_(5a) S_(5b) S_(6a) S_(6b) S_(7a) S_(7b) State 1 0 1 0 1 0 0 1 0 1 0 0 0 0 1a State 1 0 1 0 1 0 0 0 0 0 0 1 0 1 1b State 0 1 0 1 0 1 1 0 1 0 0 0 0 0 2a State 0 1 0 1 0 1 0 0 0 0 1 0 1 0 2b

Equivalent circuits for the four states are shown in FIGS. 10A-10D. Charge balance is achieved with a state-duration time of 0.25·T_(SW) for each state, yielding an average input current from V_(IN) in each state and cycle of (1/3)·Ī_(OUT).

In the analysis above, the average current Ī_(OUT) is assumed to be the same during all state-duration times, therefore, the charge transfers are proportional to t_(j)·Ī_(OUT). In an alternative approach, the average output current may be controlled to be different for different states so that the charge transfers in state j are proportional to t_(j)·Ī_(OUT,j) where both the state-duration time t_(j) and the average current Ī_(OUT,j) are determined according to the constraint equations. In some examples, the state-duration times may be further (fully or partially) constrained for other considerations, for example, to avoid short state-duration times which might cause EMI (electromagnetic interference). An example, where such variable and periodic control of output current may be effective is when driving one or more LEDs (light emitting diode) in series or in parallel, where the variation in current does not appreciably cause perceptible variation in light output.

The approach described above can be applied to the two-phase M=5 cascade multiplier type charge pump 110 of FIG. 7. One possible four-state approach (with states labeled 1 a, 1 b, 2 a, 2 b) has equivalent circuits as shown in FIGS. 11A-11B for states 1 a and 1 b, respectively. The circuits for states 2 a and 2 b are equivalent (i.e. interchanging the “a” and “b” elements of the circuit). The configuration of switches in the four states is shown in tabular form as:

Switch State S_(1a) S_(1b) S_(2a) S_(2b) S_(3a) S_(3b) S_(4a) S_(4b) S_(5a) S_(5b) S_(6a) S_(6b) S_(7a) S_(7b) State 1 0 0 0 0 0 0 0 0 1 0 1 1 0 1a State 0 0 0 1 0 1 0 1 0 0 0 1 1 0 1b State 0 1 0 0 0 0 0 0 1 0 1 0 0 1 2a State 0 0 1 0 1 0 1 0 0 0 1 0 0 1 2b

With state-duration times of 0.25·T_(SW) for each of the four states, it becomes necessary to apply a current skew, I_(SKEW), to the output load in each state to achieve charge balance over a cycle of the four states. In this example, a negative current skew of 0.2·I_(OUT) during states 1 a and 2 a, and a positive current skew of 0.2·I_(OUT) during states 1 b and 2 b will achieve charge balance in all capacitors over a cycle, where the average output current across each cycle of four states is I_(OUT). In other words, the output load current during states 1 a and 2 a is 0.8·I_(OUT) and the output load current during states 1 b and 2 b is 1.2·I_(OUT). The magnitude of the applied current skew is the same in all four states, but the polarity of the current skew changes back and forth between positive and negative from one state to the next. For a two-phase charge pump with this four-state approach and 0.25·T_(SW) state-duration times, a general solution for arbitrary M yields the following solution for the magnitude of the applied current skew, I_(SKEW):

$I_{SKEW} = {{\frac{4 - M}{M}}I_{OUT}}$

It should be understood that the description above focuses on analysis of idealized circuits with ideal switches, ideal current, voltage sources, and resistance-free circuit paths. In practice, switches are implemented, for instance, with transistors, which generally exhibit internal resistance and capacitive characteristics. The output current load may be implemented using an inductor such that during the part of the duty cycle modeled as a constant current, the current in fact fluctuates as energy is transferred from the charge pump to the inductor. Physical capacitors may have slightly different capacitances, and therefore the ideal analysis for charge balancing may not be exactly correct. Nevertheless, the approach presented above is applicable to non-ideal implementations of the approach, either exactly, or accounting for the non-ideal nature of the circuit for example, determining the state durations to achieve charge balance in a real rather than an ideal circuit, for example, using numerical circuit simulation techniques.

Implementations of a charge pump controlled according to one or more of the approaches described above may use a controller that is configured to follow a state sequence as described and to set the switches accordingly. Referring to FIG. 12, an example of a power converter 100 includes a charge pump 110 coupled to a controller 120 providing control signals on path 132 and receiving sensor signals on path 134. The charge pump 110 includes capacitors 112 and switches 114. A terminal 116 (e.g., a high voltage terminal) couples the charge pump 110 to a power source 150, for example, to a voltage source (e.g., at twenty-five volts). Another terminal 118 couples the charge pump 110 to a first regulator circuit 130, which is coupled to a load 140. A controller 120 includes a programmable processor 122 configured with configuration data 124 (and/or processor instructions), which impart functionality on the controller 120.

In some examples, the controller 120 also controls the first regulator circuit 130, for example, to maintain a common underlying clocking rate for both the charge pump 110 and the first regulator circuit 130 (e.g., switching the first regulator circuit 130 at a multiple 2×, 4×, 10×, 100×, etc. of the cycle frequency of the charge pump 110). In some implementations, the controller 120 is integrated in whole or in part in an integrated device that includes at least some of the switches 114 (e.g., transistors).

An alternative power converter 101 is illustrated in FIG. 13, where a second regulator circuit 160 is coupled between the power source 150 and the charge pump 110 instead of between the load 140 and the charge pump 110 as in FIG. 12. In some examples, the controller 120 controls the load 140 to facilitate charge balancing of the capacitors 112 within the charge pump 110. In other examples, the controller 120 controls the second regulator circuit 160 and in even other examples, the controller 120 controls both the load 140 and the second regulator circuit 160.

One more alternative power converter 102 is illustrated in FIG. 14. This example is a combination of the power converters 100, 101. In this implementation, there is a first regulator circuit 130 coupled between the load 140 and the charge pump 110; and a second regulator circuit 160 coupled between the power source 150 and the charge pump 110. In some examples the controller 120 controls at least the first regulator circuit 130 or the second regulator circuit 160, to maintain a common underlying clocking.

In other examples, either the first regulator circuit 130 or the second regulator circuit 160 is a magnetic filter, such as an LC filter, instead of a converter. If the first regulator circuit 130 is a magnetic filter, then the regulation capability of the power converter 102 is only accomplished by the second regulator circuit 160 and adiabatic operation is in part possible due to the first regulator circuit 130 acting as a current load. Similarly, if the second regulator circuit 160 is a magnetic filter, then the regulation capability of the power converter 102 is only accomplished by the first regulator circuit 130 and adiabatic operation is in part possible due to the second regulator circuit 160 acting as a current source.

It should be understood that in practice, the devices are not ideal, for example, with the capacitors 112 not necessarily having identical capacitances, and with non-zero resistances in circuit paths and through the switches 114 in the charge pump 110. In some examples, the controller 120 controls the switches 114 according to the idealized analysis. In other examples, the effect of non-idealized characteristics are taken into account in determining the state durations, for example, by explicit circuit analysis (e.g., simulation) or adaptively by adjusting the relative state durations to achieve charge balance during state cycles based upon sensor signals on path 134. In some examples, the controller 120 is software configurable, for example, allowing specific state timing to be configured after the device is fabricated. In some examples, the controller 120 is fully or at least partially implemented in application-specific logic that is specified with the other circuit components of the device.

The charge pump 110 can be implemented using many different charge pump topologies such as Ladder, Dickson, Series-Parallel, Fibonacci, and Doubler. Similarly, suitable converters for the regulator circuits 130, 160 include Buck converters, Boost converters, Buck-Boost converters, non-inverting Buck-Boost converters, Cuk converters, SEPIC converters, resonant converters, multi-level converters, Flyback converters, Forward converters, and Full Bridge converters.

It is to be understood that the foregoing description is intended to illustrate and not to limit the scope of the invention, which is defined by the scope of the appended claims. Other embodiments are within the scope of the following claims. 

1. A method comprising operating a charge pump in which switches from a first set of switches are configured to couple terminals of capacitors to permit charge transfer between said capacitors and in which switches from a second set of switches are configured to couple terminals of capacitors to a first terminal, wherein said first terminal is selected from the group consisting of a high-voltage terminal and a low-voltage terminal, wherein operating said charge pump comprises cycling said switches through a sequence of states, each state defining a corresponding configuration of said switches, at least three of said states defining different configurations of said switches, wherein, during each of said configurations, charge transfer is permitted between a pair of elements, wherein said pair of elements consists of a first capacitor and an element selected from the group consisting of a second capacitor and said first terminal.
 2. The method of claim 1, further comprising maintaining an average current passing between a regulator and said charge pump.
 3. The method of claim 1, further comprising regulating a current at said first terminal, thereby maintaining an average current passing between a regulator and said charge pump.
 4. The method of claim 1, wherein cycling said switches through a sequence of states includes maintaining each state for a corresponding duration of a fraction of a charge pump cycle time.
 5. The method of claim 3, wherein said durations of said states are selected to maintain balanced charging and discharging of each of said capacitors through said sequence of states of each cycle.
 6. The method of claim 1, further comprising controlling an average current between a regulator and said charge pump.
 7. The method of claim 1, further comprising coupling a regulator to said first terminal.
 8. The method of claim 7, further comprising causing said regulator to provide a current load at said low-voltage terminal of said charge pump.
 9. The method of claim 7, further comprising causing said regulator to operate as a current source at said high-voltage terminal of said charge pump.
 10. The method of claim 1, further comprising coupling said switches from said first and second sets of switches to said terminals of said capacitors.
 11. The method of claim 10, wherein coupling said switches comprises forming a multi-phase charge pump.
 12. The method of claim 10, wherein coupling said switches comprises forming a cascade multiplier.
 13. The method of claim 10, further comprising selecting said regulator to be a buck converter.
 14. The method of claim 1, further comprising receiving sensor signals from at least one of said first and second sets of switches and adaptively adjusting said cycling of said switches through said sequence of states based at least in part on said sensor signals.
 15. The method of claim 1, further comprising coupling a first regulator to said high-voltage terminal and coupling a second regulator to said low-voltage terminal.
 16. The method of claim 1, further comprising controlling least one of said first and second sets of switches and adaptively adjusting said cycling of said switches through said sequence of states based at least in part on sensor signals received from at least one of said first and second sets of switches.
 17. An apparatus comprising a controller and a plurality of switches, wherein said plurality of switches, when connected to a plurality of capacitors, forms a cascade multiplier, wherein said controller is configured to cause said switches to execute a plurality of cycles, each of which comprises at least first, second, and third states that last for corresponding first, second, and third state-duration times, each state being associated with a corresponding first, second, and third configuration of said switches, wherein, at the beginning of a cycle, each of said capacitors stores an initial amount of charge, wherein, at the end of said cycle, each of said capacitors stores a final amount of charge, and wherein said first, second, and third state-duration times are selected such that said initial and final amounts are equal.
 18. The apparatus of claim 17, wherein said initial and final amounts are zero.
 19. The apparatus of claim 17, wherein said controller is further configured to cause a transition between states when current through said switches is zero.
 20. The apparatus of claim 17, wherein, among said plurality of capacitors, there exists at least one capacitor that holds a constant amount of charge during at least one of said states. 